English

Newton-type Methods for Inference in Higher-Order Markov Random Fields

Computer Vision and Pattern Recognition 2017-09-06 v1 Machine Learning Numerical Analysis

Abstract

Linear programming relaxations are central to {\sc map} inference in discrete Markov Random Fields. The ability to properly solve the Lagrangian dual is a critical component of such methods. In this paper, we study the benefit of using Newton-type methods to solve the Lagrangian dual of a smooth version of the problem. We investigate their ability to achieve superior convergence behavior and to better handle the ill-conditioned nature of the formulation, as compared to first order methods. We show that it is indeed possible to efficiently apply a trust region Newton method for a broad range of {\sc map} inference problems. In this paper we propose a provably convergent and efficient framework that includes (i) excellent compromise between computational complexity and precision concerning the Hessian matrix construction, (ii) a damping strategy that aids efficient optimization, (iii) a truncation strategy coupled with a generic pre-conditioner for Conjugate Gradients, (iv) efficient sum-product computation for sparse clique potentials. Results for higher-order Markov Random Fields demonstrate the potential of this approach.

Keywords

Cite

@article{arxiv.1709.01237,
  title  = {Newton-type Methods for Inference in Higher-Order Markov Random Fields},
  author = {Hariprasad Kannan and Nikos Komodakis and Nikos Paragios},
  journal= {arXiv preprint arXiv:1709.01237},
  year   = {2017}
}

Comments

10 pages, 3 figures, 3 tables, CVPR 2017

R2 v1 2026-06-22T21:33:08.340Z